Metamath Proof Explorer

Theorem oieq2

Description: Equality theorem for ordinal isomorphism. (Contributed by Mario Carneiro, 23-May-2015)

		Ref	Expression
	Assertion	oieq2	$⊢ A = B \to OrdIso (R, A) = OrdIso (R, B)$

Proof

Step	Hyp	Ref	Expression
1		weeq2	$⊢ A = B \to (R We A \leftrightarrow R We B)$
2		seeq2	$⊢ A = B \to (R Se A \leftrightarrow R Se B)$
3	1 2	anbi12d	$⊢ A = B \to ((R We A \land R Se A) \leftrightarrow (R We B \land R Se B))$
4		rabeq	$⊢ A = B \to \{w \in A \| \forall j \in ran h j R w\} = \{w \in B \| \forall j \in ran h j R w\}$
5	4	raleqdv	$⊢ A = B \to (\forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v \leftrightarrow \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v)$
6	4 5	riotaeqbidv	$⊢ A = B \to (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v) = (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v)$
7	6	mpteq2dv	$⊢ A = B \to (h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v)) = (h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v))$
8		recseq	$⊢ (h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v)) = (h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v)) \to recs ((h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v))) = recs ((h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v)))$
9	7 8	syl	$⊢ A = B \to recs ((h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v))) = recs ((h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v)))$
10	9	imaeq1d	$⊢ A = B \to recs ((h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v))) [x] = recs ((h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v))) [x]$
11	10	raleqdv	$⊢ A = B \to (\forall z \in recs ((h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v))) [x] z R t \leftrightarrow \forall z \in recs ((h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v))) [x] z R t)$
12	11	rexeqbi1dv	$⊢ A = B \to (\exists t \in A \forall z \in recs ((h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v))) [x] z R t \leftrightarrow \exists t \in B \forall z \in recs ((h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v))) [x] z R t)$
13	12	rabbidv	$⊢ A = B \to \{x \in On \| \exists t \in A \forall z \in recs ((h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v))) [x] z R t\} = \{x \in On \| \exists t \in B \forall z \in recs ((h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v))) [x] z R t\}$
14	9 13	reseq12d	$⊢ A = B \to {recs ((h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v))) ↾}_{\{x \in On \| \exists t \in A \forall z \in recs ((h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v))) [x] z R t\}} = {recs ((h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v))) ↾}_{\{x \in On \| \exists t \in B \forall z \in recs ((h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v))) [x] z R t\}}$
15	3 14	ifbieq1d	$⊢ A = B \to if ((R We A \land R Se A), {recs ((h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v))) ↾}_{\{x \in On \| \exists t \in A \forall z \in recs ((h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v))) [x] z R t\}}, \emptyset) = if ((R We B \land R Se B), {recs ((h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v))) ↾}_{\{x \in On \| \exists t \in B \forall z \in recs ((h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v))) [x] z R t\}}, \emptyset)$
16		df-oi	$⊢ OrdIso (R, A) = if ((R We A \land R Se A), {recs ((h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v))) ↾}_{\{x \in On \| \exists t \in A \forall z \in recs ((h \in V ⟼ (ι v \in \{w \in A \| \forall j \in ran h j R w\} \| \forall u \in \{w \in A \| \forall j \in ran h j R w\} \neg u R v))) [x] z R t\}}, \emptyset)$
17		df-oi	$⊢ OrdIso (R, B) = if ((R We B \land R Se B), {recs ((h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v))) ↾}_{\{x \in On \| \exists t \in B \forall z \in recs ((h \in V ⟼ (ι v \in \{w \in B \| \forall j \in ran h j R w\} \| \forall u \in \{w \in B \| \forall j \in ran h j R w\} \neg u R v))) [x] z R t\}}, \emptyset)$
18	15 16 17	3eqtr4g	$⊢ A = B \to OrdIso (R, A) = OrdIso (R, B)$